On the blowup rate of vorticity for the Euler equations in a bounded domain
Abstract
Given that a solution to the 3D incompressible Euler equations on a bounded domain blows up at a time T and that T is the first such time, we provide pointwise-in-time lower bounds on \|Dkω\|L∞() for k ≥ 1. We also show that the Gronwall-type inequality satisfied by \|ω(t)\|L∞, in the cases that = R3, T3, or a bounded domain, exhibits wildly oscillating solutions.
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